In this paper, we study the H\"older regularity of set-indexed stochastic
processes defined in the framework of Ivanoff-Merzbach. The first key result is
a Kolmogorov-like H\"older-continuity Theorem, whose novelty is illustrated on
an example which could not have been treated with anterior tools. Increments
for set-indexed processes are usually not simply written as XU−XV, hence we
considered different notions of H\"older-continuity. Then, the localization of
these properties leads to various definitions of H\"older exponents, which we
compare to one another.
In the case of Gaussian processes, almost sure values are proved for these
exponents, uniformly along the sample paths. As an application, the local
regularity of the set-indexed fractional Brownian motion is proved to be equal
to the Hurst parameter uniformly, with probability one.Comment: 32 page
